A symmetric formulation and SUPG scheme for the shallow-water equations

## Abstract We present a new space–time SUPG formulation of the shallow‐water equations. In this formulation, we use a stabilization parameter that was introduced for compressible flows and a new shock‐capturing parameter. In the context of two test problems, we evaluate the performance of the new

The shallow water equations fall into the category of symmetric advective-diffusive systems with source terms. These types of equations can be very effectively solved using stabilized methods, such as SUPG and GLS. A semi-discrete finite element method based on these ingredients is presented for the

The shallow water equations describe large scale horizontal phenomena of the global atmospheric motion to good approximation. Thus they provide a widely accepted primary test for numerical methods for global atmospheric modelling before proceeding to complete 3D baroclinic models [7]. They are progn

A multidimensional discretisation of the shallow water equations governing unsteady free-surface flow is proposed. The method, based on a residual distribution discretisation, relies on a characteristic eigenvector decomposition of each cell residual, and the use of appropriate distribution schemes.

A study of a number of current numerical schemes for the shallow water equations leads to the establishment of relationships between these schemes. Further analysis then suggests new formulations of the schemes, as well as an alternative scheme having the same key properties.